In this chapter we will learn about vectors. properties, addition, components of vectors

• In this chapter we will learn about vectors. properties, addition, components of vectors

• When you see a vector, think components!• Multiplication of vectors will come in later chapters.• Vectors have magnitude and direction.

Chapter 3: VectorsReading assignment: Chapter 3

Homework 3.1 (due Thursday, Sept. 13):

CQ1, CQ2, 7, 11, 13, 18

Homework 3.2 (due Tuesday, Sept. 18):

3, 19, 24, 29, 30, 32, 41, AE1, AE4, AE5CQ – Conceptual question, AF – active figure, AE – active example

No need to turn in paper homework for problems that mention it.

Vectors: Magnitude and direction

Scalars: Only Magnitude A scalar quantity has a single value with an appropriate unit and has no direction.

Examples for each:

Vectors:

Scalars:

Motion of a particle from A to B along an arbitrary path (dotted line). Displacement is a vector

Coordinate systemsCartesian coordinates:

abscissa

ordinate

Vectors: • Represented by arrows (example: displacement). • Tip points away from the starting point. • Length of the arrow represents the magnitude. • In text: a vector is often represented in bold face (A)

or by an arrow over the letter; . • In text: Magnitude is written as A or

This four vectors are equal because they have the same magnitude (length) and the same direction

Adding vectors:

Draw vector A.

Draw vector B starting at the tip of vector A.

The resultant vector R = A + B is drawn from the tail of A to the tip of B.

Graphical method (triangle method):Example on blackboard:

Adding several vectors together. Resultant vector

is drawn from the tail of the first vector to the tip of the last vector.

Example on blackboard:

R A B C D

(Parallelogram rule of addition)

Commutative Law of vector addition

Order does not matter for additions

A B B A

Associative Law of vector addition

The order in which vectors are added together does not matter.

( ) ( )A B C A B C

Negative of a vector.The vectors A and –A have the same magnitude but opposite directions.

( ) 0A A

Subtracting vectors:

( )A B A B

Multiplying a vector by a scalar

The product mA is a vector that has the same direction as A and magnitude mA (same direction, m times longer).

The product –mA is a vector that has the opposite direction of A and magnitude mA.

Examples: 5

Components of a vector

sincosAAAA

22yx AAA

AA1tan

The x- and y-components of a vector:

The magnitude (length) of a vector:

The angle between vector and x-axis:

i-clicker:

You walk diagonally from one corner of a room with sides of 3 m and 4 m to the other corner.

What is the magnitude of your displacement (length of the vector)?

A. 3 mB. 4 mC. 5 mD. 7 mE. 12 m

What is the angle ?

The signs of the components Ax and Ay depend on the angle and they can be positive or negative.

(Examples)

Unit vectors• A unit vector is a dimensionless vector having a magnitude of 1.• Unit vectors are used to indicate a direction. • i, j, k represent unit vectors along the x-, y- and z-

direction• i, j, k form a right-handed coordinate system

Right-handed coordinate system:

Use your right hand:

x – thumb x – index

y – index finger or: y – middle finger

z – middle finger z – thumb

i-clicker:Which of the following coordinate systems is not a right-handed coordinate system?

The unit vector notation for the vector A is:

A = Axi + Ayj

The column notation often used in this class:

Vector addition using unit vectors:

We want to calculate: R = A + B

From diagram: R = (Ax + Bx)i + (Ay + By)j

The components of R: Rx = Ax + Bx

Ry = Ay + By

Only add components!!!!!

2222 )()( yyxxyx BABARRR

tan y y yR

R A BR A B

The magnitude of a R:

The angle between vector R and x-axis:

Vector addition using unit vectors:

Blackboard example 3.1

A commuter airplane takes the route shown in the figure. First, it flies from the origin to city A, located 175 km in a direction 30° north of east. Next, it flies 153 km 20° west of north to city B. Finally, it flies 195 km due west to city C

(a) Find the location of city C relative to the origin (the x- and y-components, magnitude and direction (angle) of R.

(b) The pilot is heading straight back to the origin. What are the coordinates of this vector.

Polar Coordinates

A point in a plane: Instead of x and y coordinates a point in a plane can be represented by its polar coordinates r and .

sincosryrx

tan 22 yxr

Blackboard example 3.2

A vector and a vector are given in

Cartesian coordinates.

(a) Calculate the components of vector .

(b) What is the magnitude of ?

(c) Find the polar coordinates of .

In this chapter we will learn about vectors. properties, addition, components of vectors

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